This remainder operation (modulo) in Python 3.0 is quite confusing. (%)
In python, if I wanted to ask:
9 % 5 = 4
But if I ask,
9 % 5 = 1
Why is the answer '1'? and not '4'?
This remainder operation (modulo) in Python 3.0 is quite confusing. (%) In python, if I wanted to ask:
But if I ask,
Why is the answer '1'? and not '4'? 


Because in python, the sign matches the denominator.
For an explanation of why it was implemented this way, read the blog post by Guido. 


10 % 5 is 0, ie, 10 is evenly divided by 5. You ask why 9 % 5 is not 4, and the answer is that both 1 and 4 can be correct answers, it depends on what 9 divided by 5 is. Of course 9 divided by 5 is 1.8, but this is integer division, in Python 3 represented by //, so I'll use // here to be clear that it's integer division we are talking about. I'll explain this by not using negative numbers, it's easier. 9 // 5 is 1. Ie, you can subtract 5 from 9 only 1 time, and the rest is 4. But if you subtract 5 from 9 one more time, well, then the rest becomes 1! So 1 is a correct answer to 9 % 5, if 9 // 5 is 2. In Python 9 // 5 is 1, because the Python integer division is a floor division, ie it always rounds down. If it has rounded up 9 // 5 would be two, and 9 % 5 would have been 1. Now lets look at the case when we use negative numbers: 9 divided by 5 is now 2. Because it is floor division, it always rounds down. That means that the rest is 1. So 9 % 5 is 1, not 4. 


This really has to do with how python rounds integer division. Mathematically, the following has to be true always for any int x and y
So from this, we can say x % y == x  (x // y) * y Now recall that python rounds integer divison toward negative infinity, not toward zero. For example 9 // 5 gives 2, not 1. With this logic, you obtain 9 % 5 = 1 


Think about it like this: 0 % 5 is 0 1 % 5 is 1 So... what if you go backwards? 1 % 5 must be 4 2 % 5 must be 3 and so on. You'll see that following this 9 % 5 is 1 NOTE: Depending on the programming language and the implementation of %, you might get different results since programmers disagree on how to handle negative numbers in % 

